The ordered pair maximizes the objective function p = 3x + 8y will be (5, 6) .Option C is correct.
<h3>What is the objective function?</h3>
The objective function is simply an equation that represents the goal production capability that relates to maximizing profits in relation to manufacturing.
On putting the values we will get the values one by one. We get;
1. (0, 0)
2. (2,7)
3. (5,6)
4. (8,1)
The maximum value obtained from the 63. Obtained from option C. The ordered pair maximizes the objective function p = 3x + 8y will be (5, 6)
Hence option C is correct.
To learn more about the objective function refer to the link;
brainly.com/question/15830007
9π/10 = <span>2.82743338823
162 degrees?
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The equation will simplify to a linear equation in n, which can be solved to find n.
n² +6n +8 = (n -2)(n -9) . . . . . . we assume this is your intent
n² +6n +8 = n² -11n +18 . . . . . . expand the right side
17n = 10 . . . . . . . . . . . . . . . . . . . add 11n -8 -n² to both sides
n = 10/17 . . . . . . . . . . divide by the coefficient of n
The number that makes the equation true is n = 10/17.
Answer:
$10 dollars per hour
Step-by-step explanation
You would have to divide $80/8 which is equal to $10
Step-by-step explanation:
When the question asks to compare the like terms of an equation, they mean to solve the equation and put the like terms or the terms that are similar in that equation.
Lets look at some examples of what like terms are:
2x+5y =?
To solve this is quite simple. 2x+3y = 5xy. Just add the 2 and 3 to get 5 and just place the xy in the end of the equation.
The pairs of like terms here are <em>x</em><em> </em><em>and</em><em> </em><em>y</em><em>,</em><em> </em><em>2</em><em> </em><em>and</em><em> </em><em>5</em>
12x-3y=?
To solve this is also quite simple. 12x-3y = 9xy Just subtract the 12 from 3 to get 9 and add the unknown values which are the x and y in the end of the equation.
The pairs of like terms here are x and y and 12 and 3.
<em>The</em><em> </em><em>like</em><em> </em><em>terms</em><em> </em><em>can </em><em>be</em><em> </em><em>the</em><em> </em><em>unknowns</em><em> </em><em>put</em><em> </em><em>together</em><em>,</em><em> </em><em>and</em><em> </em><em>the</em><em> </em><em>known</em><em> </em><em>values</em><em> </em><em>put</em><em> </em><em>together</em><em>.</em><em> </em>
Let's look at what the question asks for.
43y+22y=?
In this equation the unknown is <em>y</em><em>.</em><em> </em>The other known values are 43 and 22.
To solve this:
43+22 = 65
x+y = xy
Values are 65 and y
Add all values to make the equation.
43y+22y= 65y